M.Sc. (Mathematics)
Program Outcomes(POs)and Program Specific Outcomes(PSOs)
Program Outcomes(POs):
PO1:Knowledge and Comprehension:Recall, define, and explain fundamental concepts of algebra, analysis, topology, number theory, and differential equations.
PO2:Application and Problem Solving:Apply mathematical principles, theorems, and computational tools to formulate and solve problems in pure and applied mathematics.
PO3:Analytical and Logical Reasoning:Analyze abstract structures, mathematical proofs, and complex systems to draw logical and verifiable conclusions
PO4:Research and Inquiry Skills:Evaluate mathematical literature, identify research problems, and propose innovative methods or proofs for problem-solving and theory development.
PO5:Communication and Professional Ethics: Present mathematical ideas and solutions effectively in written and oral formats while adhering to professional ethics and academic integrity.
PO6:Independent and Lifelong Learning: Cultivate independent learning habits, curiosity, and adaptability to engage with advanced mathematical theories, computational tools, and interdisciplinary applications.
Program Specific Outcomes (PSOs):
PSO1: Abstract and Structural Reasoning: Apply the principles of Abstract Algebra, Galois Theory, and Number Theory to construct and analyze algebraic structures such as groups, rings, fields, and ideals, developing abstract reasoning and logical deduction skills.
PSO2: Analytical and Computational Proficiency: Demonstrate advanced analytical skills in real and complex analysis, differential equations, and numerical methods to model, solve, and interpret theoretical and applied mathematical problems.
PSO3: Topological and Research Insight: Construct and analyze topological and functional structures, integrating concepts of continuity, compactness, and connectedness, while developing research aptitude for abstract and applied mathematical exploration.